Download - Signal-to-Noise and Resolution Analysis of Alternately Bonded Silicon Microstrip Detectors
Slide 1Chris McGuinness, Senior Thesis, 2005
Signal-to-Noise and Resolution Analysis of Alternately Bonded
Silicon Microstrip Detectors
By Chris McGuinness
Slide 2Chris McGuinness, Senior Thesis, 2005
CMS Project and UCSB’s Involvement
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LHC Arial View
~5 miles
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CMS Detector
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CMS Tracker
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TOB Module
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TOB & TEC Modules
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Rods and Petals
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Silicon Microstrip Detectors
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Silicon Lattice
• Silicon atoms have four valence electrons Causes silicon atoms to preferentially form bonds with four other
silicon atoms in order to fill the valence band Crystal structures like the one above are the result
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Silicon Doping
Silicon lattice doped with atoms with 5 valence electrons
Silicon lattice doped with atoms with 3 valence electrons
N-doped Silicon P-doped Silicon
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P-N JunctionA diode is formed by bringing p-doped silicon in contact with n-doped silicon
Electrons from the n-doped silicon will diffuse into the p-doped silicon, filling the holes introduced by the p dopants. A depletion region, free of charge carriers, forms between the two types of silicon. This creates an electric field between the p-doped side, which now carries a larger number of electrons, and the n-doped side, which is left lacking some of its initial electrons.
Slide 13Chris McGuinness, Senior Thesis, 2005
Reverse BiasingThe depletion region can be expanded by applying a voltage across the diode. This is called reverse biasing when the edge of the n-doped silicon is at a higher potential than that of the p-doped silicon.
As illustrated above our sensors have a large region of weakly n-doped silicon, sandwiched by small regions of strongly doped p-doped and n-doped silicon. The weakly n-doped region becomes fully depleted after biasing.
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Silicon Detector
This image represents a cutaway of our silicon sensors. The p-type silicon is implanted in thin channels along the n-type bulk. A layer of insulating silicon-oxide is placed between the p-type implants and aluminum strips which are used to readout signals.
As a charged particle passes through the silicon it ionizes electron-hole pairs which react to the electric field created by the reverse biased silicon. Holes drift towards the p-doped implants and create image charges on the aluminum strip electrodes, which are readout by the APVs.
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Hypothesis
Can this method of charge readout be improved or made more efficient?
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Alternating Strips
• What if the signal from only alternating strips is read? Strips not being directly read could still capacitively transfer charge to
their neighboring strips, which are being read
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Benefits
• This would reduce the amount of electronics needed to readout signals by half Saves money directly in cost of electronics Saves cooling required to keep electronics at sub-zero
temperatures
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Potential Drawbacks
• Signal-to-Noise Signal-to-noise may decrease on strips not being directly readout
due to capacitive transfer– This effect is enhanced due to an additional coupling to the backplane
of the silicon
• Resolution The resolution may be diminished due to the lack of direct charge
readout in cells corresponding to the unbonded strips– Might be able to be compensated by using charge-weighted
positioning
• These characteristics must be compared between normally bonded and alternately bonded sensor configurations. This is the focus of my experiment.
Slide 19Chris McGuinness, Senior Thesis, 2005
Test Particles
How does one go about testing a modified module?
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Cosmic Rays
• Consist of primarily protons traveling at relativistic speeds throughout space
• Exact origin is unknown, but are assumed to come from exotic galactic/stellar events which are not well understood
• When protons collide with particles in our atmosphere they undergo nuclear reactions similar to those observed in particle accelerators Numerous types of particles are created in these interactions, but
many have very short lifetimes (pion ~2.6x10-8 sec) and do not reach us on the surface of the earth before they decay
The lifetime of a muon is slightly longer than the majority of these particles and is the primary component of cosmic rays measured from the surface of the earth
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Muons
• Muons are charged particles similar to electrons, but with much larger mass
• Provide a large source of particles which could be detected by the modules we produce
• They travel with very high momentum and thus follow very straight paths, making them a perfect source of test particles
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CRAMT Stand
Cosmic Ray Module Test Stand
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CRAMT Stand
Scintillators
Modules
Electonic Readout Hardware
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Module Box• The box which housed the five modules was
machined to align each module to within ± 50m of the others. This precision was necessary for accurate resolution measurements.
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Scintillators
• Scintillators consist of a plastic material which emits photons as charged particles pass through
• Photomultipliers convert and amplify the photon signal into an analog signal which can be interpreted by our electronics
Photomultiplier Scintillator
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Triggering
• External triggers are required to tell the electronics when an important event has taken place The APVs are consistently storing the charge
information from the sensors. All this data would overwhelm the computer, so we must discriminate which frames are important
Scintillators accomplish this by sending a signal to the readout electronics when a charged particle passes through
– By using two scintillator paddles, one on top and one on bottom of the stack of modules, we restrict the number of events saved to those where the charged particle is likely to have passed through all the sensors
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Data Analysis and Discrimination
Slide 28Chris McGuinness, Senior Thesis, 2005
Event Discrimination
• Once an event has been triggered, one must determine whether that particular event can be used for the measurement at hand
• Histograms can be filled and plotted for each triggered event representing the charge on all the strips for these events
• Clear distinctions must be made on what is classified as a signal and what is discarded as noise
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Tracks
Slide 30Chris McGuinness, Senior Thesis, 2005
Noise Weighted Signal
• By subtracting out the average charge on each strip, referred to as the pedestal, and dividing by the noise of each strip, defined to be the standard deviation of the charge, one is left with a much clearer signal lending itself to more efficient analysis.
Slide 31Chris McGuinness, Senior Thesis, 2005
Clusters
• A cluster is defined to be a group of strips which pass the cuts for a signal. In my analysis I required a strip to have a signal-to-noise of 6, and
added the neighboring strips if their signal-to-noise was above 3
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Cluster Position
• The hit position for a given cluster was determined using a charge weighted positioning algorithm defined below
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Line Fit• By requiring events with exactly one cluster per module, I
was able to limit the events used in the analysis to those which a charged particle had passed through all five sensors.
• This allowed me to take the raw data shown on the left, and interpret it into specific tracks shown on the right.
Slide 34Chris McGuinness, Senior Thesis, 2005
Signal-to-Noise Analysis
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Signal-to-Noise
• I performed the signal-to-noise measurement by including data from only the strips involved in a cluster. This garanteed that I was incoorporating all events with an actual
signal, and neglecting those from noise
• In order to determine a total signal-to-noise for a given cluster I added the signal-to-noise ratio for each strip involved in that cluster.
• This value would vary depending on the path length of the particle through the silicon, the charge, mass and momentum of the particle, and fundamental quantum fluctuations of the interaction of the particle with the silicon atoms.
Slide 36Chris McGuinness, Senior Thesis, 2005
Path Length Correction• The ionization of a charged particle passing through
silicon varies proportionally to the path length of the particle
• In order to correct for this effect one must multiply the charge by the cosine of the angle of the passing particle This would effectively correct for any additional charge deposited
due to particles passing through the detectors at a wider angle relative to the normal
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Signal-to-Noise Distribution
• The resulting values for the signal-to-noise still vary due to other quantum fluctuations The signal, or amount of charge ionized in the silicon,
will vary according to the Bethe-Bloch equation, which describes the energy loss of a charged particle passing through a medium
For the case of a thin material, of which our silicon sensors apply, the signal will follow a Landau distribution
The noise in the electronics will also contribute by smearing the Landau distribution with a Gaussian distribution
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Landau-Gaussian Convolution
• A Landau-Gaussian Convolution Distribution will result, plotted below
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Signal-to-Noise Results
Slide 40Chris McGuinness, Senior Thesis, 2005
SN vs. Region• In order to futher verify the loss of signal-to-noise being
due to poor capacitance between the bonded and unbonded strips, I made of plot of the signal-to-noise as a function of distance away from a bonded strip It is clear that signal-to-noise decreases as the hit position approaches the
unbonded strips
mp=31.9±0.29
mp=28.86±0.38
mp=22.46±0.36
mp=20.68±0.21
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Resolution Analysis
Slide 42Chris McGuinness, Senior Thesis, 2005
Theoretical Resolution Calculation
• The resolution for a one strip cluster can be roughly predicted through a direct probability distribution analysis Assume the region corresponding to a strip, with a
length P, were sliced up into a large number of sub-regions, with length dx
The probability that a particle which has passed through the strip region in question, will pass through one of the sub-regions, dx, is dx/P
P
dx
Slide 43Chris McGuinness, Senior Thesis, 2005
Theoretical Resolution Calculation
• The variance, or the square of the standard deviation, , for this probability distribution is
• If we take the origin, <x>, to be at the center of the region, it becomes 0 and
drops out of the equation
• After integrating becomes:
This is neglecting effects of the diffusion of electrons and holes near the edges of strip boundaries, angular path lengths, and two strip clusters, which will all affect the resolution.
Slide 44Chris McGuinness, Senior Thesis, 2005
Line Fit Method
• Cross section view of the five modules with the silicon thickness and cell width blown up.
• The ratio of 500 m for the silicon thickness to 180 m for the cell width is roughly proportional.
•As a particle passes through the array of modules particular strips yield signals.
•A line is fit using the coordinates of the clusters on the outer four modules.
•One can extrapolate the expected hit position on the middle module
•The resolution of the middle module is determined by comparing the actual cluster position on the middle module with the extrapolated line fit position
x
y
-z
Slide 45Chris McGuinness, Senior Thesis, 2005
Method of Least Squares
• The line fit was done using the method of least squares, sometimes referred to as 2
• This is done by minimizing the sum of the square of the difference between the measured value and the value of the function at each point
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Method of Least Squares
• After some mathematical manipulation one is left with an equation for the value of m and c
• These values are plugged in along with the x-coordinate for the middle module to yield the y-coordinate position for the extrapolated line fit
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Misalignment Effects
• Despite the highly precisioned alignment of the modules relative to each other, slight mechanical deviations are to be expected. This is not a problem in the z direction (parallel to the strip
lengths) because measurements were not performed in this direction and thus would not cause any noticeable effect
Deviations in the y direction (perpendicular to the strip lengths) will distort the line fit however
– One can compensate for these deviations by calculating residuals prior to performing the analysis
Any angular deviations cannot be compensated for using this method and will increase the error of the measurement. This error can only be estimated using a simulation
Slide 48Chris McGuinness, Senior Thesis, 2005
Biased Residuals
• Biased residuals are found by fitting a line to the hit position on all five modules, and subtracting the line fit position from the actual position measured on each module.
• If this is done for a large number of events a gaussian distribution will result. The peak of the gaussian will be offset from zero.
• The peak of the gaussian distribution is the residual or calibration constant One can artificially align the modules by subtracting
this value from each measurement taken
Slide 49Chris McGuinness, Senior Thesis, 2005
X-axis Misalignment
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Residuals
Slide 51Chris McGuinness, Senior Thesis, 2005
Simulation
• I developed a simulation program which chose an arbitrary hit position on the bottom module, and an arbitrary zenith angle for a fictitious particle
• Once the simulated track was constructed, the program determined whether that track would lead the particle through one or two strip regions of the sensor If that particular path length went through only one
region, the hit position was taken to be the location of the strip, as it would if the track were real
Slide 52Chris McGuinness, Senior Thesis, 2005
Two Strip Cluster Simulation• If the path length were to pass through a
region pertaining to two strips, things got a little trickier If I were to weigh the hit position by the path length of
the particle through the region pertaining to each strip, I would be left with perfect resolution measurements for two strip clusters
Instead, I smeared the effective path length of the particle through each region by a random gaussian distribution, with a mean of the actual path length, and a sigma of 120 m
– This resulted in two strip cluster resolution approximately equal to that of real data
Slide 53Chris McGuinness, Senior Thesis, 2005
Simulation Results• The simulation program produced resolution plots with the same
strange spikes as observed in the real data• After further investigation I noticed that these spikes where
strongly correlated with event in which a large portion of the modules had one strip clusters
• And the spikes were located at distances proportional to 1/4 of the pitch
Slide 54Chris McGuinness, Senior Thesis, 2005
Quantization Effects
Slide 55Chris McGuinness, Senior Thesis, 2005
Quantization Effects
• This led me to the conclusion that events with all, or a large portion, of one strip clusters result in certain quantized line fit geometries
• When those quantized line fit values were subtracted from a quantized hit position, quantized resolution values were likely to occur
• By limiting the number of one strip clusters I was able to minimize this effect
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Resolution Distributions
Slide 57Chris McGuinness, Senior Thesis, 2005
Line Fit Error
• The error on the line fit can be calculated using the law of combination of errors
• If the error on the y-coordinate position for a measurement is , the resulting error for a line fit at the center of an array of N measurements is , or in this case.
• This error will add in quadrature to the final resolution measurement and must be subtracted out accordingly.
Slide 58Chris McGuinness, Senior Thesis, 2005
Line Fit Error
• According to the law of combination of errors, the error for a function with two dependent variables, x and y, goes as follows:
• The function for the resolution was found using: Resolution = Yactual - Yline fit,
yielding res2 = act
2 + lf2 for the error
• Therefore, the actual error on the measurement is
Slide 59Chris McGuinness, Senior Thesis, 2005
Line Fit Error
• Since the line fit error, lf, was calculated to be ½ of the intrinsic error, act can be found in terms of the res:
• For the case of the unbonded module, this
simplification cannot be made• Once the intrinsic resolution for the normally
bonded module is measured, it can be used to compute the line fit error and plugged into
Slide 60Chris McGuinness, Senior Thesis, 2005
Systematic Error Analysis
• I used the simulation program to estimate the effect of an angular tilt in the modules with respect to one another as well
• This was done by twisting each module about the x axis by a random amount, within ±70m, and measuring the resolution for 10,000 events at that particular geometry
• By doing this with 500 different geometric configurations, I was able to plot a distribution of the varying resolution values
Slide 61Chris McGuinness, Senior Thesis, 2005
Systematic Error Analysis
Slide 62Chris McGuinness, Senior Thesis, 2005
Systematic Error Analysis
• The possible tilt of the modules used to make the line fit can only increase the error in the resolution measurement
• By subtracting in quadrature, the standard deviation of the simulation with perfect alignment, from that with the arbitrary tilts introduced, one can estimate the error introduced by the angular tilts of the modules in relation to one another Since the distribution of the simulation of the randomly tilted
modules is not gaussian, I used the RMS of the distribution for this calculation
Slide 63Chris McGuinness, Senior Thesis, 2005
Resolution Results
Normally Bonded
Alternately Bonded
Difference
One Strip Clusters
10.44%
Two Strip Clusters
13.78%
All Clusters 13.11%
Slide 64Chris McGuinness, Senior Thesis, 2005
Signal-to-Noise Results
Normally Bonded
Alternately Bonded
Difference
One Strip Clusters 35.09±0.24 32.38±0.24 7.72%
Two Strip Clusters 37.19±0.19 21.31±0.15 42.7%
Slide 65Chris McGuinness, Senior Thesis, 2005
Conclusion
• Signal-to-Noise Loss of signal through coupling to the backplane is a
significant effect, responsible for decreasing the signal-to-noise by a factor of ~43% for two strip clusters
• Resolution The resolution for the alternately bonded modules is
actually comparable to that of the normally bonded module, differing by 10-14%
Slide 66Chris McGuinness, Senior Thesis, 2005
Future Studies
• The decrease in signal-to-noise is of concern for the proposed design One way of improving the signal-to-noise for an
alternately bonded sensor type would be to increase the coupling of strips with neighboring strips while decreasing the coupling to the backplane
This can be achieved by designing modules to have smaller pitch between strips
– Another type of module being built in our lab has a smaller pitch between strips. I plan to perform similar tests on these types of modules in hopes to improve the signal-to-noise
Slide 67Chris McGuinness, Senior Thesis, 2005
The End
Th-th-th-that’s all folks!!!!